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38 votes
38 votes
What the route of 67

User Rami Amro Ahmed
by
3.3k points

1 Answer

14 votes
14 votes

Given:

The number 67.

To find the square root of 67, use the rational approximation,


\begin{gathered} (p_0)/(q_0),Herep_0,q_0\text{ are integers.} \\ p_{\mleft\{i+1\mright\}}=p^2_i+nq^2_i \\ q_{\mleft\{i+1\mright\}}=2p_iq_i \end{gathered}

Apply this formula to get better approximation.


\begin{gathered} p_0=8,n=67,q_0=1 \\ p_1=p^2_0+nq^2_0 \\ p_1=(8)^2+67(1)^2=131 \\ q_1=2p_0q_0=2(8)(1)=16 \end{gathered}

Again apply the formula,


\begin{gathered} p_2=p^2_1+nq^2_1 \\ p_2=131^2+(67)(16)^2=34313 \\ q_2=2p_1q_1=2(131)(16)=4192 \end{gathered}

Now thw approximation becomes,


\sqrt[]{67}=(p_2)/(q_2)_{}=(34313)/(4192)=8.18535

Answer:


\sqrt[]{67}=8.1854\text{ ( up to 4 decimal)}

User TodK
by
3.2k points
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